Existence and Distribution of Solutions of ax = b modulo pn

Abstract

Initial objective of this dissertation is to study the existence of the solutions of the congruence ax = by (mod pn) and distribution of solutions (x, y) as n varies in natural numbers, where a and b are integers coprime to prime p. We observe that as n tends to infinity, solutions take the form of p-adic integers. This motivates us, to study the existence of the solutions of equation ax = b in p-adic integers. The relevant case is when a and b are units in p-adic integers. If the solution exists we try to find it out. We resolve the case of a, b in U1 completely. A necessary and sufficient condition for the existence of the solution of ax = b where a, b are elements of U1, is `valuation of a-1 is smaller than the valuation of b-1'. In this case, if the solution exists then it is given by log b / log a. In the other case, where a and b are p-adic units but not elements of U1, we give the criteria for the existence of the solution of ax = b. Write a and b as product of Teichmuller unit and an element of U1. Suppose a= a1 a2 and b = b1 b2 where a1, b1 are Teichmuller units and a2, b2 are in U1. Then the solution of ax = b exists if b1 belongs to the group generated by a1 and valuation of a2 - 1 is smaller than the valuation of b2 -1.